  
  
  [1XIndex[0X
  
  [2X\^[0X  6.2-2
  Abelian Crossed Product  7.8
  [10XActionForCrossedProduct[0m  5.1-1
  [2XAverageSum[0X  6.2-3
  Basis of units (for crossed product)  7.6
  (Brauer) equivalence  7.5
  central simple algebra  7.5
  [2XCentralizer[0X  6.2-1
  Classical Crossed Product  7.9
  CoefficientsAndMagmaElements  5.2-1
  Crossed Product  7.6
  [2XCrossedProduct[0X  5.1-1
  Cyclic Algebra  7.10
  Cyclic Crossed Product  7.7
  Cyclotomic algebra  7.11
  cyclotomic class  7.17
  [2XCyclotomicClasses[0X  6.3-1
  e(G,K,H)  7.13
  e_C(G,K,H)  7.13
  [2XElementOfCrossedProduct[0X  5.2-1
  [10XEmbedding[0m  5.2-1
  equivalence (Brauer)  7.5
  equivalent strong Shoda pairs  7.15
  field of character values  7.4
  generating cyclotomic class  7.17
  group algebra  7.1
  group ring  7.1
  [2XInfoWedderga[0X  6.4-1
  [2XIsCompleteSetOfOrthogonalIdempotents[0X  4.2-1
  [10XIsCrossedProduct[0m  5.1-1
  [10XIsCrossedProductObjDefaultRep[0m  5.2-1
  [2XIsCyclotomicClass[0X  6.3-2
  [10XIsElementOfCrossedProduct[0m  5.2-1
  [2XIsSemisimpleANFGroupAlgebra[0X  6.1-3
  [2XIsSemisimpleFiniteGroupAlgebra[0X  6.1-4
  [2XIsSemisimpleRationalGroupAlgebra[0X  6.1-2
  [2XIsSemisimpleZeroCharacteristicGroupAlgebra[0X  6.1-1
  [2XIsShodaPair[0X  3.2-2
  [2XIsStronglyMonomial[0X  3.2-3
  [2XIsStrongShodaPair[0X  3.2-1
  [10XLeftActingDomain[0m  5.1-1
  [2XOnPoints[0X  6.2-2
  primitive central idempotent  7.4
  primitive central idempotent realized by a Shoda pair  7.14
  primitive central idempotent realized by a strong Shoda pair and a cyclotomic class  7.17
  [2XPrimitiveCentralIdempotentsByCharacterTable[0X  4.1-1
  [2XPrimitiveCentralIdempotentsBySP[0X  4.3-2
  [2XPrimitiveCentralIdempotentsByStrongSP[0X  4.3-1
  Quaternion algebra  5.1-1
  semisimple ring  7.2
  Shoda pair  7.14
  [2XSimpleAlgebraByCharacter[0X  2.2-1
  [2XSimpleAlgebraByCharacterInfo[0X  2.2-2
  [2XSimpleAlgebraByStrongSP[0X (for rational group algebra)  2.2-3
  [2XSimpleAlgebraByStrongSP[0X (for semisimple finite group algebra)  2.2-3
  [2XSimpleAlgebraByStrongSPInfo[0X (for rational group algebra)  2.2-4
  [2XSimpleAlgebraByStrongSPInfo[0X (for semisimple finite group algebra)  2.2-4
  [2XSimpleAlgebraByStrongSPInfoNC[0X (for rational group algebra)  2.2-4
  [2XSimpleAlgebraByStrongSPInfoNC[0X (for semisimple finite group algebra)  2.2-4
  [2XSimpleAlgebraByStrongSPNC[0X (for rational group algebra)  2.2-3
  [2XSimpleAlgebraByStrongSPNC[0X (for semisimple finite group algebra)  2.2-3
  strongly monomial character  7.16
  strongly monomial group  7.16
  strong Shoda pair  7.15
  [2XStrongShodaPairs[0X  3.1-1
  [10XTwistingForCrossedProduct[0m  5.1-1
  [10XUnderlyingMagma[0m  5.1-1
  varepsilon(K,H)  7.13
  Wedderburn components  7.3
  Wedderburn decomposition  7.3
  [2XWedderburnDecomposition[0X  2.1-1
  [2XWedderburnDecompositionInfo[0X  2.1-2
  [5XWedderga[0m package  -1
  [2XWEDDERGABuildManual[0X  6.4-2
  [2XWEDDERGABuildManualHTML[0X  6.4-3
  [10XZeroCoefficient[0m  5.2-1
  
  
  -------------------------------------------------------
